Category:Examples of Complex Division
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This category contains examples of Complex Division.
Let $\struct {\C, +, \times}$ be the field of complex numbers.
The operation of division is defined on $\C$ as:
- $\forall a, b \in \C \setminus \set 0: \dfrac a b := a \times b^{-1}$
where $b^{-1}$ is the multiplicative inverse of $b$ in $\C$.
Pages in category "Examples of Complex Division"
The following 9 pages are in this category, out of 9 total.
C
- Complex Division/Examples
- Complex Division/Examples/(1 + sin theta + i cos theta) (1 + sin theta - i cos theta)^-1
- Complex Division/Examples/(1-i) (1+i)^-1
- Complex Division/Examples/(2 - 3i) (4 - i)^-1
- Complex Division/Examples/(3 - 2i) (-1 + i)^-1
- Complex Division/Examples/(3 - 2i) (-1 + i)^-1/Proof 1
- Complex Division/Examples/(3 - 2i) (-1 + i)^-1/Proof 2
- Complex Division/Examples/(3+4i) (1+2i)^-1